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Using continued fractions, Lekkerkerker proved the average number of summands of an $m \\in [F_n, F_{n+1})$ is essentially $n/(\\varphi^2 +1)$, with $\\varphi$ the golden ratio. Miller-Wang generalized this by adopting a combinatorial perspective, proving that for any positive linear recurrence the number of summands in decompositions for integers in $[G_n, G_{n+1})$ converges to a Gaussian distribution. 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